AbstractWe prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence function converges to 0 (is Cesàro summable to 0). These criteria are applied to some classes of max-infinitely divisible processes
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
AbstractLet η=(η(t))t∈T be a sample continuous max-infinitely random field on a locally compact metr...
AbstractWe prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its depe...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
AbstractMax-stable processes arise in the limit of component-wise maxima of independent processes, u...
Maxstable processes arise in the limit of componentwise maxima of independent processes, under appro...
AbstractMax-stable processes arise in the limit of component-wise maxima of independent processes, u...
AbstractLet (Xt)tϵT be a real-valued, stationary, infinitely divisible stochastic process. We show t...
AbstractCambanis, Hardin and Weron (1987) have characterized the ergodic symmetric stable processes ...
AbstractLet (Xt)tϵT be a real-valued, stationary, infinitely divisible stochastic process. We show t...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
AbstractLet η=(η(t))t∈T be a sample continuous max-infinitely random field on a locally compact metr...
AbstractWe prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its depe...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
We prove that a stationary max-infinitely divisible process is mixing (ergodic) iff its dependence f...
AbstractMax-stable processes arise in the limit of component-wise maxima of independent processes, u...
Maxstable processes arise in the limit of componentwise maxima of independent processes, under appro...
AbstractMax-stable processes arise in the limit of component-wise maxima of independent processes, u...
AbstractLet (Xt)tϵT be a real-valued, stationary, infinitely divisible stochastic process. We show t...
AbstractCambanis, Hardin and Weron (1987) have characterized the ergodic symmetric stable processes ...
AbstractLet (Xt)tϵT be a real-valued, stationary, infinitely divisible stochastic process. We show t...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
International audienceWe revisit conservative/dissipative and positive/null decomposi-tions of stati...
AbstractLet η=(η(t))t∈T be a sample continuous max-infinitely random field on a locally compact metr...
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